Reduced-quaternion inframonogenic functions on the ball
Abstract
A function f from a domain in R3 to the quaternions is said to be inframonogenic if ∂\, f∂ =0, where ∂ = ∂/∂ x0+ (∂/∂ x1)e1+(∂/∂ x2) e2. All inframonogenic functions are biharmonic. In the context of functions f=f0+f1e1+f2e2 taking values in the reduced quaternions, we show that the homogeneous polynomials of degree n form a subspace of dimension 6n+3. We use them to construct an explicit, computable orthogonal basis for the Hilbert space of square-integrable inframonogenic functions defined in the ball in R3.
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