#ThisWeeksFiddler, 20260515

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This week the #puzzle is: Can You Play Hide-and-Seek? #minimum #maximum #minmax #coding #probabilities #InfiniteSum #integral

I (Nis) am playing hide-and-seek with my nephew. I start at point O, whereas my nephew can hide at point A, B or C. I can walk from O to A in 2 minutes, from O to B in 3 minutes, from O to C in 4 minutes, and from B to C in 5 minutes. To get from A to B or from A to C, I must pass through O.
My goal is to minimize the time it takes to find him, no matter how clever his strategy might be. What is this optimal time?

And for extra credit:

My nephew can no longer hide at C, and is instead limited to A and B. But this time, he has a teleporter that can instantaneously transport him from A to B or from B to A. He can use the teleporter as many times as he wants. However, he can’t react to my approach, and must instead plan out his transport schedule ahead of time. That said, he does know the precise time when the game starts.
My goal is to minimize the average time it takes to find him, no matter how clever his strategy might be. What is this optimal time?

Can You Play Hide-and-Seek?

Solution, possibly incorrect:

Program xxx xxx

So, I’m looking for a strategy, where the maximum time is minimized. The maximum time is the time required to look in both A, B and C.

A strategy should look in both A, B and C. It can described by the order in which Nis visits these places. Nephew’s strategy can be described by where he is hiding. Let’s look at all the strategies and all the related times. (I did these by hand and confirmed them with a program.) Nis’s strategies going down, Nephew’s strategies going across:

ABCMax
ABC271212
ACB213813
BAC831414
BCA143814
CAB1015415
CBA149414

Example of calculation: ACB is actually the path OAOCB, and the time required is 2 + 2 + 4 + 5 = 13.

The min-max occurs with the strategy ABC, and the time is 12 minutes.

And for extra credit:

WolframAlpha

Method 1: I modify my program to also look at teleporter strategies. A strategy for Nis can still be described by the order in which he looks in different places, but he might have to look in more than 2 places, and he has the option to stand still in 1 place for a while. For Nephew there’s a sample rate involved. To keep things simple, I say that Nis (when not on the move) looks once every minute. The strategy BBA for Nis would be: go to B and look immediately, wait 1 minute and then look again, and finally go to A. A strategy for Nephew has to describe where he is when Nis is looking. BBA would describe being at B after 1 and 2 minutes and then at A after 3 minutes. Both sets of strategies will stretch to infinity, as the worst case is that Nis never finds Nephew. But I put in a limit in the program, where I simply say, if Nephew hasn’t been found by this time, assume the time will be finite, but large. I also keep track of how many times I invoke this large time.

My program produces something like this:

Winner: AAAAAAAAAAA, time 3.10449,
    4 cases out of 4096 of not being found
Winner: AAAAAAAAAAB, time 3.10449,
    4 cases out of 4096 of not being found

And I go: oooh.

Method 2: Assume AAA… is the best strategy.

1: Can I argue, that this might be the case?

Let’s look at 4 simple classes of strategies for Nis, beginning with AA, AB, BA and BB.

  • AA uses 2 minutes to get to A and then stays there for 1 minute.
  • AB uses 2 minutes to get to A and then uses 5 minutes to go to B.
  • BA uses 3 minutes to get to B and then uses 5 minutes to go to A.
  • BB uses 3 minutes to get to B and then stays there for 1 minute.

And how are these doing against Nephew’s strategies? * is used as a wild card.

  • AA finds Nephew with the strategies *A* and **A*.
  • AB finds Nephew with the strategies *A* and ******B*.
  • BA finds Nephew with the strategies **B* and ********A*.
  • BB finds Nephew with the strategies ***B* and ****B*.

AB and BA are horrible. It takes 2-3 minutes to look in 1 place, and then 5 more minutes to look in the next. All that time wasted. AA and BB seems better. Further AA looks better than BB, because it starts looking earlier. So, case argued. Go to A and stay put. Sooner or later Nephew will show up.

2: What is the average time of the strategy AAA…?

If I’m still working with a sample rate, Δ, this goes into my calculation.

  • After 2 minutes Nis looks for Nephew at A. Half his strategies has him there, and Nis finds him.
  • After 3 minutes Nis looks for Nephew at A again. Half of his remaining strategies has him there, and Nis finds him.

This represents this average of times:

E(t)=22+322+...E(t)=\frac{2}{2}+\frac{3}{2²}+…

Or to use my variable Δ:

E(t)=22+2+Δ22+2+2Δ23+...E(t)=\frac{2}{2}+\frac{2+\Delta}{2²}+\frac{2+2\Delta}{2³}+…

E(t)=n=02+nΔ2n+1E(t)=\sum_{n=0}^{\infty}\frac{2+n\Delta}{2^{n+1}}

E(t)=n=022n+1+n=0nΔ2n+1E(t)=\sum_{n=0}^{\infty}\frac{2}{2^{n+1}}+\sum_{n=0}^{\infty}\frac{n\Delta}{2^{n+1}}

E(t)=n=012n+n=0nΔ2n+1E(t)=\sum_{n=0}^{\infty}\frac{1}{2^n}+\sum_{n=0}^{\infty}\frac{n\Delta}{2^{n+1}}

E(t)=2+n=0nΔ2n+1E(t)=2+\sum_{n=0}^{\infty}\frac{n\Delta}{2^{n+1}}

So far we have the result, that the average time is 2 minutes or more. Makes sense.

If I simply let Δ = 0, the whole average time will be 2 minutes.

HOWEVER. Nis is not playing against all strategies. Nephew knows about this strategy and might simply decide to go to B and stay there. In which case E(t) = ∞. Not good.

Method 1 again: I look at some of the other candidates for strategies. Hm.

Method 3: Assume a best strategy. A best strategy has to include some randomness, otherwise Nephew could just always be the other place. It also has to discard the idea of a sample rate, because Nephew could fight that having a higher teleporter rate. “You didn’t find me at A, because I was at B? Well, now I will stay at B for 5 minutes, knowing you can’t catch me there. Well, 4 minutes, just to make sure.”

Those 5 minutes have to figure into Nis’ strategy.

Randomness. Begin by looking at A or B, but randomly. It can’t pay to look at A early, even though it’s possible, Nephew could simply decide to be at B at this time. So look at either A or B after 3 minutes. (The latter is the strategy “B”. The former is “AA”. Or maybe “OA”, that is, staying at O for 1 minute before going to A. Or maybe simply “-A”, signifying 1 minute of random walking + 2 minutes of walking from O to A.) Choose between “B” and “-A” by the flip of a coin. Both looking at A and looking at B are now equally probable. Nephew doesn’t have any advantage of choosing one over the other. I assume Nephew will also flip a coin to choose either A or B. So after 3 minutes, half of the time Nephew will be found.

The next step is to be at A or B with equal probability some time later. It takes 5 minutes to switch places, so that has to be the next time, 3+5 = 8 minutes. The 4 resulting strategies could be “-A—-A”, “-AB”, “B—-A” and “B—-B”. (Walking between A and B for 5 minutes. Or walking between A and A for 5 minutes.) Again, half of the time Nephew will now be found.

The average time looks like this, upcycling the formula from above.

E(t)=32+822+...E(t)=\frac{3}{2}+\frac{8}{2²}+…

E(t)=32+3+522+2+2523+...E(t)=\frac{3}{2}+\frac{3+5}{2²}+\frac{2+2\cdot5}{2³}+…

E(t)=n=03+5n2n+1E(t)=\sum_{n=0}^{\infty}\frac{3+5n}{2^{n+1}}

WolframAlpha assures me this is 8 minutes.

Hugo-langnoveller, 2026

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Her er årets nominerede langnoveller, med samt link til mine anmeldelser:

“The Girl That My Mother Is Leaving Me For” by Cameron Reed###Den nye pige i mors liv
“Kaiju Agonistes” by Scott Lynch###Den stærke kaiju
“The Millay Illusion” by Sarah Pinsker##-Millay-illusionen
“Never Eaten Vegetables” by H.H. Pak###Næsten En Vegetar
“Rapport: Friendship, Solidarity, Communion, Empathy” by Martha Wells###Rapport: venskab, solidaritet, fællesskab, empati
“When He Calls Your Name” by Catherynne M. Valente##-Når han siger dit navn

Overvældende godt felt! Det er svært. Kaijuen skulle måske i virkeligheden kun have 2,5/3. Men så er der stadig 3 kandidater tilbage. Murderbot er jo dejlig. Vegetaren er også stadig charmerende. Så måske er pigen på tredjepladsen. Decisions, decisions! Det bliver Murderbot som nr. 1.

Når han siger dit navn

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Anmeldelse af “When He Calls Your Name” (gratis), af #CatherynneMValente. Langnovelle. 2025. Hugo-finalist.

Nebula nominees . Hugo finalists .

Skitse: Fortælleren har egentlig et solidt liv. Hun blev gift med Charlie, og sammen fik de noget fornuftigt ud af en kedelig grund med en ramponeret lade. Det blev et hjem. De elskede hinanden. Så hvorfor har hun bundet Charlie til sengen, mens han råber en andens navn, og hvorfor sidder hun selv ude på verandaen med et haglgevær?

Er det science fiction? Nix. Fantasy/horror.

Temaer: Det kom snigende ind, at da den andens navn blev afsløret, så kendte jeg jo godt noget af den her historie. Omend det er nyt, at der er overnaturlige kræfter involveret.

Der er en diskussion af begrebet ejerskab. At et ægtepar kan eje et hjem. At en kvinde kan eje sin mand?

Citat: “He bellowed for her out of the belly of the house.”

Er det godt? Ja. Men slutningen virkede brat på mig. ##-

Millay-illusionen

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Anmeldelse af “The Millay Illusion” (gratis), af #SarahPinsker. Langnovelle. 2025. Hugo-finalist.

Nebula nominees . Hugo finalists .

Skitse: Et show kan indeholde alle mulige små numre: den trænede hund, akrobater. Både fortælleren og “Millay”, tidligere Miller, er tryllekunstnere. Og kvinder. Den ene klæder sig ud som mand, den anden optræder fjollet. Fordi kvinder kan jo ikke lave seriøst, dygtigt tryl.

Er det science fiction? Nej. Fantasy?

Temaer: Tryl. Kvinder. Sexisme.

Er det godt? Ja da. Men jeg gættede godt nok næsten slutningen for tidligt. ##-

Den nye pige i mors liv

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Anmeldelse af “The Girl That My Mother Is Leaving Me For” (gratis), af #CameronReed. Langnovelle. 2025. Hugo-finalist.

Nebula nominees . Hugo finalists .

Skitse: En stinkerig kvinde leder et forretningsimperie. Desuden “lever hun evigt”, i den forstand, at den næste leder skal være hendes egen klon. Opdraget på samme måde som stifteren af imperiet, sådan som man gør i hver generation. Fortælleren skal være gravid med klonen og siden opdrage barnet. Det er ikke nogen økonomisk fest, men det er meget mere stabilt end alternativet, hvor en gåtur om sommeren indebærer brændemærker fra fortovet, når man besvimer i varmen. Desværre er det kun blevet til en stribe aborter indtil nu, så er ny pige er ved at blive installeret, der kan overtage jobbet.

Er det science fiction? Ja.

Temaer: Der er en del af plottet, der kredser om en teknologi, hvor konstruerede kroppe kan modtage en uploadet person. Det er fx genialt at blive en superstærk vagt, når man ellers ikke rigtig kunne få et job i sin kedelige, normale krop.

Fortælleren er en transkvinde, og det spiller på flere måder en stor rolle i historien.

Er det godt? Jo. Klamt. ###

Rapport: venskab, solidaritet, fællesskab, empati

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Anmeldelse af “Rapport: Friendship, Solidarity, Communion, Empathy” (gratis), af #MarthaWells. Langnovelle. 2025. Hugo-finalist.

Nebula nominees . Hugo finalists .

Skitse: Det gode rumskib Perihelion er i gang med en mission, som Iris leder. De skal besøge en rumstation. Der lige er blevet erobret af en fjendtlig gruppe. Øv.

Er det science fiction? Jepper.

Temaer: Langnovellen er del af Murderbot-serien, omend det her er en usædvanlig del af serien, dels fordi den foregår tidligere i kronologien end den foregående historie, dels fordi Murderbot ikke selv er med. Men bare rolig. Perihelion er på enhver måde Murderbots gode ven, inklusive alle de verbale stikpiller.

Historien kommer til at dreje sig om Peri, der tydeligt er påvirket af at have mødt Murderbot. Mødt? Påvirket? Hvad betyder de ord, når begge parter er konstruerede personer, der ikke opfører sig 100 % som mennesker, og Peri er et rumskib?

Iris og hendes gruppe kommer fra et ikke-kapitalistisk samfund, så vi ser hele tiden deres reaktioner på penge & co.

Er det godt? Åh ja. Iris er rigtig rar at være sammen med og håndterer Peris krise på en god måde. ###

#ThisWeeksFiddler, 20260508

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This week the #puzzle is: Can You Drink the “Random-ade”? #MonteCarlo #coding #probabilities

I’m preparing a mixture of “random-ade” using a large, empty pitcher and two 12-ounce glasses.
First, I fill one glass with some amount of lemon juice chosen randomly and uniformly between 0 and 12 ounces. I fill the other glass with some amount of water, also chosen randomly and uniformly between 0 and 12 ounces. Next, I pour an equal amount from each glass into the pitcher until one of the glasses is empty.
At this point, I refill that empty glass with yet another random amount of the same liquid it previously contained. Once again, I pour an equal amount from each glass into the pitcher until one of the glasses is empty.
On average, how much random-ade can I expect to prepare? (Note that all three random amounts in this problem are chosen independently of each other.)

And for extra credit:

Once again I’m preparing random-ade, but this time I have three 12-ounce glasses.
I fill the first glass with a random amount of lemon juice, the second glass with a random amount of lime juice, and the third glass with a random amount of water. As before, each amount is chosen uniformly between 0 and 12 ounces, and all amounts are independent. Next, I pour an equal amount from each glass into the pitcher until one of the glasses is empty.
At this point, I refill that empty glass with yet another random amount of the same liquid it previously contained. Once again, I pour an equal amount from each glass into the pitcher until one of the glasses is empty.
Then I refill that now-empty glass with yet another random amount of the same liquid it previously contained. Again, I pour an equal amount from each glass into the pitcher until one of the glasses is empty.
On average, how much random-ade can I expect to prepare?

Can You Drink the “Random-ade”?

Solution, possibly incorrect:

Program

Method 1, sanity check.

  • If the random amounts are small, then a small amount gets into the pitcher, at the lowest 0.
  • If the random amounts are all in the middle, we get 2 * 6 + 2 * 0 = 12.
  • If the random amounts are large, we get 2 * 12 + 2 * 12 = 48.
  • We expect somewhere in between 0 and 48, tending towards 12.

Method 2, Monte Carlo:

Fiddler?  True. 10000000 loops. Amount of randomade, average: 14.00286

Method 3, probabilities, integral etc. Oh my. I don’t dare go that way. Especially not when Monte Carlo is so easy.

Let’s say 14.00.

And for extra credit:

Method 1, sanity check.

  • 0.
  • 3 * 6 + 3 * 0 + 3 * 0 = 18.
  • 3 * 12 + 3 * 12 + 3 * 12 = 108.
  • We expect somewhere in between 0 and 108, tending towards 18.

Method 2, Monte Carlo:

Fiddler? False. 10000000 loops. Amount of randomade, average: 22.20186

Let’s say 22.20.

Den stærke kaiju

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Anmeldelse af “Kaiju Agonistes” (gratis), af #ScottLynch. Langnovelle. 2025. Hugo-finalist.

Nebula nominees . Hugo finalists .

Skitse: Galaksen fungerer sådan, at de gamle, vise rumvæsener patruljerer rundt blandt planeterne. Når en planet viser tegn på at kunne have intelligent liv, så smider de et frø ned, der er klar til at vokse op og gøre noget ved sagerne, hvis intelligenserne opfører sig dumt. Således fik Jorden sådan et frø for 200.000 år siden. Efter WW2 er der radioaktivitet i luften, så frøet vågner op. Bliver til en kaiju. Tramper rundt. Bliver slået ned. Tror man. Monsteret i Stillehavet bliver flittigt diskuteret i både Moskva og Washington.

Er det science fiction? Ja da. Rumvæsener og alternate history, mums.

Temaer: Godzilla! Kaiju! Hvad du nu har lyst til at sige. Og jeg tror, der er guf her, hvis man har set filmene. Kaiju har lært princippet, at hvis man tramper rundt længe nok, så vil planeten opgive vold. Men sådan er mennesker jo ikke indrettet, næ nej.

En god del humor. Politikere er jo sjove? Og jeg klukkede da lidt, da Jacques Cousteau blev meldt savnet. Og da Kennedy lovede, at der indenfor et årti ville blive bygget en Kaiju-overvågende rumstation.

Er det godt? Jeg var bange for, at det hele skulle drukne i kommunist-klicheer, men tog heldigvis fejl. Det er sjovt. Det læner sig i hvert fald til dels opad noget historie og kultur, jeg kender. Der er en god slutning. ###

Nebula-langnoveller, 2026

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Her er årets nominerede langnoveller, med samt link til mine anmeldelser:

Our Echoes Drifting Through the Marsh” by Marie Croke (Beneath Ceaseless Skies 1/9/25)##-Vore ekkoer svæver gennem mosen
Uncertain Sons” by Thomas Ha (Uncertain Sons)#–Usikre sønner
We Begin Where Infinity Ends” by Somto Ihezue (Clarkesworld Magazine 2/25)##-Vi begynder hvor evigheden slutter
The Name Ziya by Wen-Yi Lee (Tor)###Navnet Ziya
Never Eaten Vegetables” by H.H. Pak (Clarkesworld Magazine 1/25)###Næsten En Vegetar
The Life and Times of Alavira the Great as Written by Titos Pavlou and Reviewed by Two Lifelong Friends” by Eugenia Triantafyllou (Uncanny Magazine 3-4/25)##-Alavira den Store, anmeldt

Godt felt. 2 med topkarakter, kun 1 fuser. (Lige nu kan jeg ikke huske “evigheden” ud fra titlen.) Det er vegetaren, der får plads nr. 1 hos mig.

Næsten En Vegetar

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Anmeldelse af “Never Eaten Vegetables” (gratis), af #HHPak. Langnovelle. 2025. Nebula-nomineret, Hugo-finalist.

Nebula nominees . Hugo finalists .

Skitse: Et rumskib på vej mod en ny planet har 10.000 frosne, befrugtede æg ombord. Pludselig bliver 500 af dem tøet op og begynder at blive fostre. Hvad gør et klogt rumskib nu? / Et barn bliver undervist af virtuelle lærere. / En voksen besøger en virtuel frø.

Er det science fiction? Jeps.

Temaer: Der er altså 3 tidslinjer, så vi kan følge historien på forskellige tidspunkter. Det endte med, at rumskibet, NEV-476, byggede sig selv om, så de små 500 babyer kunne komme godt i gang med livet. Det krævede ofre, og de 9.500 andre æg blev “slukket”. At de 500 derefter voksede op med virtuelle lærere var helt efter planen. Men det er et problem, at de ikke er 10.000. Koloniseringen af den nye planet er betalt af et stort firma, der har øjnene stift rettet mod bundlinjen, og der skal leveres, uanset hvor mange de er!

I det hele taget fylder aktionærerne pænt meget. Tidligt i historien får NEV både ordre om at slukke for fostrenes næring og ilt og om absolut ikke at slukke. Suk. Den proces kunne måske godt have været strømlinet.

Den virtuelle frø repræsenterer rumskibet, og vi lærer en hel del mere om, hvad hun (fordi skibet bliver jo en slags mor) har tænkt undervejs. Hun har selv måttet tage kurser hos de virtuelle lærere, om babyer og babymad og meget andet godt. Hun bruger overraskende meget energi på at tænke på navne. Hvorfor man bruger dem, hvad de betyder. Det nyeste er, at en langvarig retssag er endt med at påvise, at optøningen af æggene var hendes fejl, så nu skal hun slettes.

Citat fra en lærer, om frøer bl.a.: “Millions of years of rain cycles. Crop domestication. Dogs. Wow.” Nemlig. Wow.

På et tidspunkt får vi at vide, at en frisure har “inkuberet” under en hat. Tihi.

Er det godt? Ja! Det er nok med vilje, at firmaet skal være så frustrerende. ###