An Overview of Mathematical Issues Arising in the Geometric Complexity Theory Approach to VP≠VNP
نویسندگان
چکیده
We discuss the geometry of orbit closures and the asymptotic behavior of Kronecker coefficients in the context of the geometric complexity theory program to prove a variant of Valiant’s algebraic analogue of the P = NP conjecture. We also describe the precise separation of complexity classes that their program proposes to demonstrate.
منابع مشابه
An overview of mathematical issues arising in the Geometric complexity theory approach to VP v.s. VNP
We discuss the geometry of orbit closures and the asymptotic behavior of Kronecker coefficients in the context of the Geometric Complexity Theory program to prove a variant of Valiant’s algebraic analog of the P 6= NP conjecture. We also describe the precise separation of complexity classes that their program proposes to demonstrate.
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We discuss the geometry of orbit closures and the asymptotic behavior of Kronecker coefficients in the context of the Geometric Complexity Theory program to prove a variant of Valiant’s algebraic analog of the P 6= NP conjecture. We also describe the precise separation of complexity classes that their program proposes to demonstrate.
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We discuss the geometry of orbit closures and the asymptotic behavior of Kronecker coefficients in the context of the Geometric Complexity Theory program to prove a variant of Valiant’s algebraic analog of the P 6= NP conjecture. We also describe the precise separation of complexity classes that their program proposes to demonstrate.
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ورودعنوان ژورنال:
- SIAM J. Comput.
دوره 40 شماره
صفحات -
تاریخ انتشار 2011