the Unicode infix operators (in category Sm), such as ⊕, are parsed as infix operators and are available for user-defined methods (e.g. you can use const ⊗ = kron to define ⊗ as an infix Kronecker product) can also be suffixed with modifying marks, primes, and sub/superscripts, e.g. +̂ₐ″ is parsed as an infix operator with the same precedence as +. A space is required between an operator that ends with a to user-defined operators. For example, if you define ⊗(A, B) = kron(A, B) to give a convenient infix syntax A ⊗ B for Kronecker products (kron), then [A, B] .⊗ [C, D] will compute [A⊗C, B⊗D] with no

the Unicode infix operators (in category Sm), such as ⊕, are parsed as infix operators and are available for user-defined methods (e.g. you can use const ⊗ = kron to define ⊗ as an infix Kronecker product) can also be suffixed with modifying marks, primes, and sub/superscripts, e.g. +̂ₐ″ is parsed as an infix operator with the same precedence as +. A space is required between an operator that ends with a to user-defined operators. For example, if you define ⊗(A, B) = kron(A, B) to give a convenient infix syntax A ⊗ B for Kronecker products (kron), then [A, B] .⊗ [C, D] will compute [A⊗C, B⊗D] with no

the Unicode infix operators (in category Sm), such as ⊕, are parsed as infix operators and are available for user-defined methods (e.g. you can use const ⊗ = kron to define ⊗ as an infix Kronecker product) can also be suffixed with modifying marks, primes, and sub/superscripts, e.g. +̂ₐ″ is parsed as an infix operator with the same precedence as +. A space is required between an operator that ends with a to user-defined operators. For example, if you define ⊗(A, B) = kron(A, B) to give a convenient infix syntax A ⊗ B for Kronecker products (kron), then [A, B] .⊗ [C, D] will compute [A⊗C, B⊗D] with no

the Unicode infix operators (in category Sm), such as ⊕, are parsed as infix operators and are available for user-defined methods (e.g. you can use const ⊗ = kron to define ⊗ as an infix Kronecker product) can also be suffixed with modifying marks, primes, and sub/superscripts, e.g. +̂ₐ″ is parsed as an infix operator with the same precedence as +. A space is required between an operator that ends with a to user-defined operators. For example, if you define ⊗(A, B) = kron(A, B) to give a convenient infix syntax A ⊗ B for Kronecker products (kron), then [A, B] .⊗ [C, D] will compute [A⊗C, B⊗D] with no

the Unicode infix operators (in category Sm), such as ⊕, are parsed as infix operators and are available for user-defined methods (e.g. you can use const ⊗ = kron to define ⊗ as an infix Kronecker product) can also be suffixed with modifying marks, primes, and sub/superscripts, e.g. +̂ₐ″ is parsed as an infix operator with the same precedence as +. A space is required between an operator that ends with a to user-defined operators. For example, if you define ⊗(A, B) = kron(A, B) to give a convenient infix syntax A ⊗ B for Kronecker products (kron), then [A, B] .⊗ [C, D] will compute [A⊗C, B⊗D] with no

the Unicode infix operators (in category Sm), such as ⊕, are parsed as infix operators and are available for user-defined methods (e.g. you can use const ⊗ = kron to define ⊗ as an infix Kronecker product) can also be suffixed with modifying marks, primes, and sub/superscripts, e.g. +̂ₐ″ is parsed as an infix operator with the same precedence as +. A space is required between an operator that ends with a to user-defined operators. For example, if you define ⊗(A, B) = kron(A, B) to give a convenient infix syntax A ⊗ B for Kronecker products (kron), then [A, B] .⊗ [C, D] will compute [A⊗C, B⊗D] with no

the Unicode infix operators (in category Sm), such as ⊕, are parsed as infix operators and are available for user-defined methods (e.g. you can use const ⊗ = kron to define ⊗ as an infix Kronecker product) can also be suffixed with modifying marks, primes, and sub/superscripts, e.g. +̂ₐ″ is parsed as an infix operator with the same precedence as +. A space is required between an operator that ends with a to user-defined operators. For example, if you define ⊗(A, B) = kron(A, B) to give a convenient infix syntax A ⊗ B for Kronecker products (kron), then [A, B] .⊗ [C, D] will compute [A⊗C, B⊗D] with no

the Unicode infix operators (in category Sm), such as ⊕, are parsed as infix operators and are available for user-defined methods (e.g. you can use const ⊗ = kron to define ⊗ as an infix Kronecker product) can also be suffixed with modifying marks, primes, and sub/superscripts, e.g. +̂ₐ″ is parsed as an infix operator with the same precedence as +. A space is required between an operator that ends with a to user-defined operators. For example, if you define ⊗(A, B) = kron(A, B) to give a convenient infix syntax A ⊗ B for Kronecker products (kron), then [A, B] .⊗ [C, D] will compute [A⊗C, B⊗D] with no

the Unicode infix operators (in category Sm), such as ⊕, are parsed as infix operators and are available for user-defined methods (e.g. you can use const ⊗ = kron to define ⊗ as an infix Kronecker product) can also be suffixed with modifying marks, primes, and sub/superscripts, e.g. +̂ₐ″ is parsed as an infix operator with the same precedence as +. A space is required between an operator that ends with a applicable to user-defined operators. For example, if you define ⊗(A,B) = kron(A,B) to give a convenient infix syntax A ⊗ B for Kronecker products (kron), then [A,B] .⊗ [C,D] will compute [A⊗C, B⊗D] with no additional

the Unicode infix operators (in category Sm), such as ⊕, are parsed as infix operators and are available for user-defined methods (e.g. you can use const ⊗ = kron to define ⊗ as an infix Kronecker product) can also be suffixed with modifying marks, primes, and sub/superscripts, e.g. +̂ₐ″ is parsed as an infix operator with the same precedence as +. A space is required between an operator that ends with a applicable to user-defined operators. For example, if you define ⊗(A,B) = kron(A,B) to give a convenient infix syntax A ⊗ B for Kronecker products (kron), then [A,B] .⊗ [C,D] will compute [A⊗C, B⊗D] with no additional