Let h[n] be the finite impulse response of a 1D filter. What does that imply about its inverse filter? The inverse cannot possibly be FIR.

Proof: Let H(omega) G(omega) = 1 for all omega, where H is the DTFT of h[n], and G is the DTFT of g[n]. If h[n] is FIR, then g[n] must be IIR.

Of course, there are ways to *approximate* the inverse IIR filter with an FIR filter. A basic method is adaptive filtering, e.g., Least Mean Squares (LMS) algorithm. Or just truncate the IIR filter. You still need to worry about stability, though.

For practical purposes, there probably is no desirable solution to your specific question. Especially if, for example, this is in image processing and you are trying to inverse an FIR blur filter with FIR sharpening filter. The final image will not look that good, period, unless your sharpening filter is really, really large.

EDIT: Let y[n] = b0 x[n-0] + b1 x[n-1] + ... + bN x[n-N]. Let this equation characterize the forward system, where y is the output and x is the input. By definition, the impulse response is the output when the input is an impulse: h[n] = b0 d[n-0] + b1 d[n-1] + ... + bN d[n-N]. This impulse response has finite length N+1.

Now, consider the inverse system where x is the output and y is the input. Then the impulse response is described by the recurrence equation d[n] = b0 h[n] + b1 h[n-1] + ... + bN h[n-N]. Equivalently, b0 h[n] = d[n] - b1 h[n-1] - ... - bN h[n-N].

Without loss of generality, assume that b0 and bN are both nonzero. For any m, if h[m] is nonzero, then h[m+N] is also nonzero. Because this system has feedback, its impulse response is infinitely long. QED.

Causality does not matter. The inverse of a delay is an advance, and vice versa. Neither a delay or an advance alter the finiteness of an impulse response. Shift an infinite impulse response left or right; it is still infinite.

EDIT 2: For clarification, this proof is not related to my original "proof". One was in frequency domain, the other in time domain.