Results 161 to 170 of about 6,174 (204)
Some of the next articles are maybe not open access.
Theoretical Computer Science, 2018
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Rongxing Xu, Xuding Zhu
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Rongxing Xu, Xuding Zhu
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2021
A discussion of two-person zero-sum games in combinatorial game theory along with documentation of the software development process for creating an Android application that solves the game of Nim.
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A discussion of two-person zero-sum games in combinatorial game theory along with documentation of the software development process for creating an Android application that solves the game of Nim.
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2022
Summary: Pyramid Nim is played on a directed acyclic graph. Players remove vertices of a path of undominated vertices. We determine Grundy-values for some small games of Pyramid Nim, and Grundy-values for a special class of directed acyclic graphs called triangular pyramids.
Curran, Stephen J. +3 more
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Summary: Pyramid Nim is played on a directed acyclic graph. Players remove vertices of a path of undominated vertices. We determine Grundy-values for some small games of Pyramid Nim, and Grundy-values for a special class of directed acyclic graphs called triangular pyramids.
Curran, Stephen J. +3 more
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The Journal of Structured Finance, 2007
A net interest margin (NIM) securitization is essentially an interest only (IO) strip, with its cash flow derived from a transaction9s net interest proceeds as well as from interest rate caps, corridors, and swaps, and, for most RMBS NIMs, prepayment penalty charges.
Mark Zelmanovich +3 more
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A net interest margin (NIM) securitization is essentially an interest only (IO) strip, with its cash flow derived from a transaction9s net interest proceeds as well as from interest rate caps, corridors, and swaps, and, for most RMBS NIMs, prepayment penalty charges.
Mark Zelmanovich +3 more
openaire +1 more source
2019
NIM is a game in which two players take turns removing tokens from piles. There are usually several non overlapping piles each of which can have any amount of tokens in it. In a turn a player selects a nonempty pile and removes any positive number of tokens from it. The player that removed the last token(s) wins the game.This thesis focused on a
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NIM is a game in which two players take turns removing tokens from piles. There are usually several non overlapping piles each of which can have any amount of tokens in it. In a turn a player selects a nonempty pile and removes any positive number of tokens from it. The player that removed the last token(s) wins the game.This thesis focused on a
openaire +1 more source
2016
A discussion of two-person zero-sum games in combinatorial game theory along with documentation of the software development process for creating an Android application that solves the game of Nim.
openaire +1 more source
A discussion of two-person zero-sum games in combinatorial game theory along with documentation of the software development process for creating an Android application that solves the game of Nim.
openaire +1 more source