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hopfalle

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The answer HOPFALLE has 0 possible clue(s) in existing crosswords.

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There are 8 letters in HOPFALLE ( A¹E¹F⁴H⁴L¹O¹P³ )

To search all scrabble anagrams of HOPFALLE, to go: HOPFALLE?

Rearrange the letters in HOPFALLE and see some winning combinations

6 letters out of HOPFALLE

FELLAH

5 letters out of HOPFALLE

ALEPH FELLA HALLO HAOLE HELLO HOLLA LAPEL

4 letters out of HOPFALLE

3 letters out of HOPFALLE

ALE ALL ALP APE APO ELF ELL FEH FOE FOH FOP HAE HAO HAP HEP HOE HOP LAP LEA LOP OAF OLE OPE PAH PAL PEA PEH POH POL

2 letters out of HOPFALLE

AE AH AL EF EH EL FA FE HA HE HO LA LO OE OF OH OP PA PE

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Hopfalle might refer to
In mathematics, a Hopf algebra, named after Heinz Hopf, is a structure that is simultaneously an (unital associative) algebra and a (counital coassociative) coalgebra, with these structures' compatibility making it a bialgebra, and that moreover is equipped with an antiautomorphism satisfying a certain property. The representation theory of a Hopf algebra is particularly nice, since the existence of compatible comultiplication, counit, and antipode allows for the construction of tensor products of representations, trivial representations, and dual representations. * Hopf algebras occur naturally in algebraic topology, where they originated and are related to the H-space concept, in group scheme theory, in group theory (via the concept of a group ring), and in numerous other places, making them probably the most familiar type of bialgebra. Hopf algebras are also studied in their own right, with much work on specific classes of examples on the one hand and classification problems on the other. They have diverse applications ranging from Condensed-matter physics and quantum field theory to string theory and LHC phenomenology . * Theorem (Hopf) Let A be a finite-dimensional, graded commutative, graded cocommutative Hopf algebra over a field of characteristic 0. Then A (as an algebra) is a free exterior algebra with generators of odd degree.

Hopfalle might refer to

In mathematics, a Hopf algebra, named after Heinz Hopf, is a structure that is simultaneously an (unital associative) algebra and a (counital coassociative) coalgebra, with these structures' compatibility making it a bialgebra, and that moreover is equipped with an antiautomorphism satisfying a certain property. The representation theory of a Hopf algebra is particularly nice, since the existence of compatible comultiplication, counit, and antipode allows for the construction of tensor products of representations, trivial representations, and dual representations.
* Hopf algebras occur naturally in algebraic topology, where they originated and are related to the H-space concept, in group scheme theory, in group theory (via the concept of a group ring), and in numerous other places, making them probably the most familiar type of bialgebra. Hopf algebras are also studied in their own right, with much work on specific classes of examples on the one hand and classification problems on the other. They have diverse applications ranging from Condensed-matter physics and quantum field theory to string theory and LHC phenomenology .
* Theorem (Hopf) Let A be a finite-dimensional, graded commutative, graded cocommutative Hopf algebra over a field of characteristic 0. Then A (as an algebra) is a free exterior algebra with generators of odd degree.

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