Fulves, Karl

Book

1986
Written by Karl Fulves*
Work of Karl Fulves*

39 pages (Spiralbound), published by Selfpublished
Illustrated with drawings by Joseph K. Schmidt
Language: English

25 entries

Creators	Title	Comments & References		Page	Categories
Karl Fulves*	Introduction	stating the problem: a deck is shuffled in any in and out sequence and from final order, a shuffling sequence is derived to return to the original order	Related to The Recycling Problem (Karl Fulves, Faro & Riffle Technique, 1969) The General Recycling Problem (Karl Fulves, Faro Possibilities, 1979)	1	Articles / Intros & Epilogues
Karl Fulves*	Least Totals	six-card deck solution for problem in introduction		2	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Flotation Device	another solution for problem in introduction		4	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Ring Diagrams		Related to The Endless Belts (Fred Black, Expert Card Technique, 1940) Shuffle Diagrams (Karl Fulves, The Return Trip*, 1986)	5	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	A Catalog of Shuffles	another solution for problem in introduction		6	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	The Uniqueness Theory	on the uniqueness of the order after a random in/out faro shuffle sequence		9	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Transpoker	two poker hands, each Ace through Five in red and black, spectator names one of the values, performer shuffles the hands together and deals, named value is only odd-backed card in both hands, "transposition shuffle"	Related to Unit Transpo (Karl Fulves, Faro & Riffle Technique, 1970) Shuttle Shuffle (Karl Fulves, Notes From Underground, 1973) Variations Transpoker II (Karl Fulves, The Return Trip, 1986) Transpoker III (Karl Fulves, The Return Trip, 1986)	11	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities Cards / Effect Themes / Gambling / Poker / Miscellaneous
Karl Fulves*	Time Bent Back	what one knows about the last shuffle of an in/out faro shuffle sequence		13	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Separation Shuffles	faro shuffle sequences that mix each half within itself, keeping them separated	Related to Carbon Copy (Karl Fulves, Notes From Underground*, 1973)	14	Cards / Principles / Stacked Deck Stuff / Divided Deck Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Singleton Shuffles	"separation shuffles" that allow one card from both halves to transpose		16	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Transpoker II	another method	Inspired by Transpoker (Karl Fulves, The Return Trip*, 1986)	17	Cards / Effect Themes / Gambling / Poker / Miscellaneous
Karl Fulves*	Transpoker III	reverse faro method	Inspired by Transpoker (Karl Fulves, The Return Trip, 1986) Related to Duo Spell (Paul Swinford, The Pallbearers Review, 1968) also in: Duo Spell (More Self-Working Card Tricks*, 1984)	18	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Anti-Faro & Reverse Faro Cards / Effect Themes / Gambling / Poker / Miscellaneous
Karl Fulves*	Mechanical Faro	shaving the ends to make faros easier	Related to Deck Preparation for Faro Shuffles (Alex Elmsley, The Collected Works of Alex Elmsley — Volume 2, 1994)	20	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / General Comments
Karl Fulves*	If Known	another solution for problem in introduction if total number of shuffles is known		22	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Shuffle Diagrams		Related to Ring Diagrams (Karl Fulves, The Return Trip*, 1986)	23	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	The Stay Stak Constraint	as stay stack features applies to problem in introduction		25	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities Cards / Principles / Stacked Deck Stuff / Stay Stack / Full Deck Cards / Principles / Stacked Deck Stuff / Stay Stack / Packet
Karl Fulves*	Ring Subset			26	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	How Many States?			27	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Primitive Cycles		Related to The Restacking Pack (Alex Elmsley, The Collected Works of Alex Elmsley — Volume 2, 1994)	28	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Faro Stacking
Karl Fulves*	Basic Shuffle Equations	how many shuffles it takes to get a deck back to original order		29	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Position Equations	notation for faro shuffling		30	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Mix Relativity	faro type from the point of view of the card		31	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Expanded Decks	notation for faro shuffling		31	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Not in Descartes	futile method of Cartesian notation		32	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities
Karl Fulves*	Faro Trees	"The faro tree gives a clear, unambiguous picture of what happens to the deck as it is shuffled."		33	Cards / Sleights / Shuffles (non-riffle) / Faro Shuffle / Mathematical Facts & Curiosities

Data entered by Denis Behr, May 2017.

The Return Trip