Given 3 IEEE754 floats a, b, c that are not +/INF and not NaN and a < b, is it safe to assume that a  c < b  c? Or, can you give an example when this is incorrect?

Suppose a is approximately 0.00000000000000001, b is approximately 0.00000000000000002, and c is 1. Then a − c and b − c will both equal −1. (That's assuming doubleprecision, a.k.a. 64bit, values. For higherprecision values, you'll need to add some more zeroes.) Edited to add explanation: If we ignore denormalized values and notanumber values and infinities and so on, and just focus on IEEE 754 doubleprecision floatingpoint value for the sake of having something concrete to look at, then — in terms of the binary representation, a floatingpoint value consists of a sign bit s (0 for positive, 1 for negative), an elevenbit exponent e (with an offset of 1023, such that e=0 means 2^{−1023} and e=1023 means 2^{0}, i.e. 1), and a 52bit fixedpoint significand m (representing 52 places past the binary point, so it ranges from [0,1) with finite precision). The actual value of the representation is therefore (−1)^{s} × (1 + m) × 2^{e−1023}. Because the significand is fixedpoint, and has a fixed number of bits, the precision is very finite. A value like 1.00000000000000001 and a value like 1.00000000000000002 are identical for very many places past the decimal — more places than a doubleprecision significand can hold. When you perform addition or subtraction between a very large number and a very small number (relative to each other: in our example, 1 is "very large"; alternatively, we could have used 1 as the very small value and chosen a very large value of 10000000000000000), the resulting exponent is going to be determined almost entirely by the very large number, and the significand of the very small number has to get scaled appropriately. In our case, it gets divided by about 10^{17}; so it simply disappears. The significand doesn't hold enough bits to be able to distinguish that. 

